Controlling second-order rogue matter wave and line bright soliton dynamics in 2D Bose-Einstein Condensate with higher-order interactions and gain/loss atoms

Abstract: We investigate the two-dimensional modified Gross-Pitaevskii equation, accounting for the effects of atom gain/loss and a time-independent isotropic confining potential, utilizing the Hirota's bilinear method. Through an appropriate bilinear form, we derive exact one-soliton and multi-soliton solutions. These solutions showcase two prominent phenomena: the second-order rogue matter wave with spatio-temporal localization, and the line soliton with double spatial localization. We demonstrate the feasibility of controlling the soliton amplitude and the effects of gain/loss resulting in areas of collapse by suitably tuning the coefficient of higher-order interactions in the Bose-Einstein condensate. Additionally, by exploring the interaction dynamics of the multi-soliton solutions, we identify elastic-type interactions, claiming the intrinsic properties of solitons. The influence of higher-order interactions and gain/loss terms on the interaction dynamics is also thoroughly analyzed. These analyses demonstrate that, within the framework of Bose-Einstein condensates described by the two-dimensional modified Gross-Pitaevskii equation, higher-order interactions provide a means to control the properties of the generated rogue matter waves. Extensive numerical simulations have been carried out, and their convergence with the theoretically predicted results highlights the emergent features of the obtained solutions. The exact analytical solutions derived in this study rigorously satisfy the original governing equation, thereby ensuring their consistency with the numerical findings and confirming their accuracy. Thus, our findings hold promise for potential future applications.